The hierarchy of omega1-Borel sets
Abstract
The family omega1-Borel sets is the smallest family of subsets of the real line which contains the family of open sets and is closed under complementation and omega1 unions. We show: Theorem 1. MA+notCH implies this hierarchy has length omega2. Theorem 2. In the Cohen real model it has length either omega1+1 or omega1+2.
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